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New conjecture of the prime numbers

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  • Filippo Giordano
    Except n = 17, 19, 46, 58, 64, 67, 85 there is always a couple of prime numbers equidistant from n^2 + n, enclosed between n^2 and (n+1)^2 . Eccetto n = 17,
    Message 1 of 1 , May 6, 2003
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      Except n = 17, 19, 46, 58, 64, 67, 85
      there is always a couple of prime numbers equidistant from n^2 + n, enclosed between n^2 and (n+1)^2 .
      Eccetto n = 17, 19, 46, 58, 64, 67, 85
      c'รจ sempre una coppia di numeri primi equidistanti da n^2 + n, inclusa fra n^2 e (n+1)^2.

      Example
      n p n(n+1) p distanza

      1) 1 2 3 1
      2) 5 6 7 1
      3) 11 12 13 1
      4) 17 20 23 3
      5) 29 30 31 1
      6) 41 42 43 1
      7) 53 56 59 3
      8) 71 72 73 1
      9) 83 90 97 7

      www.matematicamente.it
      F.Giordano: na nuova congettura sui numeri primi

      Regards.
      Filippo Giordano


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